hyperbolasinto

Hyperbolasinto is a term used in speculative geometry and certain science fiction compendia to denote a continuous family of conic curves related to the standard hyperbola. It is not part of classical geometry, but it is used to discuss how conic sections respond to parameter variation and coordinate-style transformations in fictional or hypothetical contexts.

The hyperbolasinto curves are defined by the equation x^2/a^2 - y^2/b^2 = c, where a and b are

Geometric properties of hyperbolasinto include symmetry about both coordinate axes and invariance of the asymptote directions

Origins and use: The term Hyperbolasinto was coined in fictional mathematical literature to illustrate parameterized families

See also: hyperbola, conic sections, asymptote, parameterized curves.